The Big Picture Chapter 3. We want to examine a given computational problem and see how difficult it is. Then we need to compare problems Problems appear.

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Presentation on theme: "The Big Picture Chapter 3. We want to examine a given computational problem and see how difficult it is. Then we need to compare problems Problems appear."— Presentation transcript:

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We want to examine a given computational problem and see how difficult it is. Then we need to compare problems Problems appear different We want to cast them into the same kind of problem decision problems in particular, language recognition problem Examining Computational Problems

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A decision problem is simply a problem for which the answer is yes or no (True or False). A decision procedure answers a decision problem. Examples: Given an integer n, does n have a pair of consecutive integers as factors? The language recognition problem: Given a language L and a string w, is w in L? Our focus Decision Problems

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The Power of Encoding For problem already stated as decision problems. encode the inputs as strings and then define a language that contains exactly the set of inputs for which the desired answer is yes. For other problems, must first reformulate the problem as a decision problem, then encode it as a language recognition task

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Everything is a String Pattern matching on the web: Problem: Given a search string w and a web document d, do they match? In other words, should a search engine, on input w, consider returning d? The language to be decided: { : d is a candidate match for the query w}

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Everything is a String Does a program always halt? Problem: Given a program p, written in some some standard programming language, is p guaranteed to halt on all inputs? The language to be decided: HP ALL = {p : p halts on all inputs}

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Everything is a String What If we’re not working with strings? Anything can be encoded as a string. is the string encoding of X. is the string encoding of the pair X, Y.

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Everything is a String Primality Testing Problem: Given a nonnegative integer n, is it prime? An instance of the problem: Is 9 prime? To encode the problem we need a way to encode each instance: We encode each nonnegative integer as a binary string. The language to be decided: PRIMES = {w : w is the binary encoding of a prime number}.

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Problem: Given an undirected graph G, is it connected? Instance of the problem: 1 2 3 4 5 Encoding of the problem: Let V be a set of binary numbers, one for each vertex in G. Then we construct  G  as follows: Write |V| as a binary number, Write a list of edges, Separate all such binary numbers by “/”. 101/1/10/10/11/1/100/10/101 The language to be decided: CONNECTED = {w  {0, 1, /}* : w = n 1 /n 2 /…n i, where each n i is a binary string and w encodes a connected graph, as described above}. Everything is a String

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Casting sorting as decision: Problem: Given a list of integers, sort it. Reformulation: Transform the sorting problem into one of examining a pair of lists. The language to be decided: L ={w 1 # w 2 :  n  1 (w 1 is of the form, w 2 is of the form, and w 2 contains the same objects as w 1 and w 2 is sorted)} Examples: 1,5,3,9,6#1,3,5,6,9 1,5,3,9,6#1,2,3,4,5,6,7 Turning Problems Into Decision Problems

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Casting database querying as decision: Problem: Given a database and a query, execute the query. Reformulation: Transform the query execution problem into evaluating a reply for correctness. The language to be decided: L = {d # q # a: d is an encoding of a database, q is a string representing a query, and a is the correct result of applying q to d} Example: (name, age, phone), (John, 23, 567-1234) (Mary, 24, 234-9876)#(select name age=23)# (John) Turning Problems Into Decision Problems

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By equivalent we mean that either problem can be reduced to the other. If we have a machine to solve one, we can use it to build a machine to do the other using just the starting machine and other functions that can be built using a machine of equal or lesser power. The Traditional Problems and their Language Formulations are Equivalent

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Consider the multiplication example: L ={w of the form: x =, where: is any well formed integer, and integer 3 = integer 1  integer 2 } Given a multiplication machine, we can build the language recognition machine: Given the language recognition machine, we can build a multiplication machine: An Example

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Finite State Machines An FSM to accept a * b *: We call the class of languages acceptable by some FSM regular There are simple useful languages that are not regular: An FSM to accept A n B n = { a n b n : n  0} How can we compare numbers of a’s and b’s? The only memory in an FSM is in the states and we must choose a fixed number of states in building it. But no bound on number of a’s

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Another Example Bal, the language of balanced parentheses contains strings like (()) or ()(), but not ()))( important, almost all programming languages allow parentheses, need checking PDA can do the trick, not FSM We call the class of languages acceptable by some PDA context-free. There are useful languages not context free. A n B n C n = { a n b n c n : n  0} a stack wouldn’t work. All popped out and get empty after counting b

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Turing Machines FSM and PDA (exists some equivalent PDA) are guaranteed to halt. But not TM. Now use TM to define new classes of languages, D and SD A language L is in D iff there exists a TM M that halts on all inputs, accepts all strings in L, and rejects all strings not in L. in other words, M can always say yes or no properly A language L is in SD iff there exists a TM M that accepts all strings in L and fails to accept every string not in L. Given a string not in L, M may reject or it may loop forever (no answer). in other words, M can always say yes properly, but not no. give up looking? say no? D  SD Bal, A n B n, A n B n C n … are all in D how about regular and context-free languages? In SD but D: H = { : TM M halts on input string w} Not even in SD: H all = { : TM M halts on all inputs}

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A Tractability Hierarchy P : contains languages that can be decided by a TM in polynomial time NP : contains languages that can be decided by a nondeterministic TM (one can conduct a search by guessing which move to make) in polynomial time PSPACE: contains languages that can be decided by a machine with polynomial space P = NP ? Biggest open question for theorists P  NP  PSPACE

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Decidability Issues Goal of the book: be able to make useful claims about problems and the programs that solve them. cast problems as language recognition tasks define programs as state machines whose input is a string and output is Accept or Reject

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Decision Procedures An algorithm is a detailed procedure that accomplishes some clearly specified task. A decision procedure is an algorithm to solve a decision problem. Decision procedures are programs and must possess two correctness properties: must halt on all inputs when it halts and returns an answer, it must be the correct answer for the given input

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Decidability A decision problem is decidable iff there exists a decision procedure for it. A decision problem is undecidable iff there exists no a decision procedure for it. A decision problem is semiecidable iff there exists a semidecision procedure for it. a semidecision procedure is one that halts and returns True whenever True is the correct answer. When False is the answer, it may either halt and return False or it may loop (no answer). Three kinds of problems: decidable (recursive) not decidable but semidecidable (recursively enumerable) not decidable and not even semidecidable Note: Usually defined w.r.t. Turing machines most powerful formalism for algorithms decidable = Turing-decidable

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Checking for even numbers: Is the integer x even? Let / perform truncating integer division, then consider the following program: even(x:integer)= If(x/2)*2 = x then return True else return False Is the program a decision procedure? Decidable

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Halting Problem: For any Turing machine M and input w, decide whether M halts on w. w is finite H = { : TM M halts on input string w} asks whether M enters an infinite loop for a particular input w Java version: Given an arbitrary Java program p that takes a string w as an input parameter. Does p halt on some particular value of w? haltsOnw(p:program, w:string) = 1. simulate the execution of p on w. 2. if the simulation halts return True else return False. Is the program a decision procedure? Undecidable but Semidecidable

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Halting-on-all (totality) Problem: For any Turing machine M, decide whether M halts on all inputs. H ALL = { : TM M halts on all inputs} If it does, it computes a total function equivalent to the problem of whether a program can ever enter an infinite loop, for any input differs from the halting problem, which asks whether M enters an infinite loop for a particular input Java version: Given an arbitrary Java program p that takes a single string as input parameter. Does p halt on all possible input values? haltsOnAll(p:program) = 1. for i = 1 to infinity do: simulate the execution of p on all possible input strings of length i. 2. if all the simulations halt return True else return False. Is the program a decision procedure? A semidecision procedure? Not even Semidecidable